Answer:
$800 will become $ 1300 in 6.94 years when compounded continuously at the annual interest rate of 7%.
Solution:
Given that
Amount deposited = $800,
Rate if interest = 7% = 0.07
Required amount = $1300
And most important thing that interest is compounded continuously.
Formula of Amount where interest is compounded continuously is as follows
[tex]A=P e^{\mathrm{rt}}[/tex]
Where A is final amount,
P is principal Amount,
r = rate of interest
t = duration in years
In our case A = $1300, P = $800, r = 0.07. We need to evaluate “t” that is number of year.
On substituting given values in formula of amount we get
[tex]1300=800 e^{0.07 t}[/tex]
[tex]\frac{1300}{800} = \mathrm{e}^{0.07 \mathrm{t}}[/tex]
[tex]1.625=\mathrm{e}^{0.07 \mathrm{t}}[/tex]
Taking ln both the sides
[tex]\ln (1.625)=(0.07 \mathrm{t}) \ln ^{e}[/tex]
[tex]l n^{e}[/tex] = 1 .So we get,
ln(1.625) = 0.07t
[tex]t = \frac{ln 1.625}{0.07}[/tex]
= 6.9358 ≈ 6.94 years
Hence $800 will become $ 1300 in 6.94 years when compounded continuously at the annual interest rate of 7%.
